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数学 高校生

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Ⅱ. 次の英文の空欄 ( 11 ) から ( 20 )に入る最も適切な英単語を, a. ~d.の中から 1つ選びなさい。 解答は解答用紙1枚目 (マークシート方式)の所定の解答欄にマークし なさい。 2893 000 Lego bricks. (Image source: Wikimedia Commons-CC license) Car made from Lego bricks. Lego has unveiled its first bricks made from recycled plastic bottles and ( 11 ) that it hopes to include the pieces in sets within two years. The prototype 4x2 bricks have been made from PET plastic from ( 12 ) bottles with additives to give them the strength of standard Lego parts, and are the result of three years of ( 13 ) with 250 variations of materials. It has already ( 14 ) plans to remove single-use plastic from boxes, and since 2018 has been ( 15 ) parts from bio-polyethylene (bio-PE), made from sustainably sourced sugarcane. These parts are bendy pieces, such as trees, leaves and accessories for figurines. Tim Brooks, vice-president for environmental ( 16 ) at Lego Group, said the biggest challenge was "rethinking and innovating new materials that are as ( 17 ), strong and high (18) as our existing bricks and fit with Lego elements made over the past 60 years". He added: "We're committed to playing our part in building a sustainable future for generations of children. We want our products to have a positive ( 19 ) on the planet, not just with the play they inspire, but also with the materials we use. We still have a long 20 ) we are making." way to go on our journey, but are pleased with the Hillary Osborne, "Lego develops first bricks made from recycled plastic bottles", The Guardian, 23 June, 2021. (https://www.theguardian.com/lifeandstyle/2021/jun/23/lego- develops-first-bricks-made-of-recycled-plastic-bottles) (-)

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数学 高校生

解答1の四角で囲んだ部分についてなのですが、なぜnは4以上の時になるのですか? どなたかお願いします🙏

考え方 296 漸化式 an+1=f(n)・an =1,(n+3)an+1=nan で定義される数列{an}の一般項 αn を求めよ. 解答1 漸化式は an+1= 4 an+1=f(n)an となる. ここで, これをくり返すと, 解答 2 漸化式の両辺に(n+2)(n+1)を掛けると, (n+3)(n+2)(n+1)an+1=(n+2)(n+1)nan DOD bn=(n+2)(n+1) nan とおくと, この式はbn+1=0となる. 解答1 漸化式を変形して, このとき an= n n+gan と変形できて,f(n)=+3 とおくと, An+1=f(n)an=f(n){ƒ(n−1)an_1}=ƒ(n)ƒ(n − 1){ƒ(n−2)an-2} an+1=f(n)f(n-1) f(n-2)......f(1)a1 az= よって, an+1= n+2n+1 3 1 1+3a1² n n+3a 50=1/11 2 a3= 2+3 92= 4 のとき, ① をくり返し用いると, n-1.n-2.n-3.n-4 -an 2 2+3 1+391 10 2 ··1= n+2n+1n この式はn=1,2,3のときも成り立つ. よって, an= ・① 4321 n_n-1 F7654 6 n(n+1)(n+2) n(n+1)(n+2) SOURON 解答2 漸化式の両辺に(n+2) (n+1)を掛けると, (n+3)(n+2)(n+1)an+1=(n+2)(n+1) ここで,b=(1+2)(1+1) 16 より 16 bn=(n+2)(n+1) nan であるから, (n+2)(n+1)nan=6 -a an I and *** n-1 n+2 a₁=1 n-1n-2 n+2n+1 -an-1 nan REAVES (1) x(n+1) an+1 bn=(n+2)(n+1) nan とおくと, ② は bn+1=bn となり, =(n+2)(n+1)nan これはすべての自然数nに対して成り立つ. したがって, bn=bn-1=bn-2=......=b1 a=1 (n+3)(n+2) -an-2 6 an=n(n+1)(n+2) Testo At **R*12*10 (282,4)

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